. Decide if the statement is true or false, and tell why.

a. 7 ƒ 23
b. 24 is a factor of 8.
c. 16 ƒ 16
d. 0 ƒ 6
e. 15 ƒ 0
f. 65 is a multiple of 15.
g. n3 is a divisor of n5
h. A number is always a factor of its square.

I don't know what your "ƒ" indicates.

b. 8 is a factor of 24.

f. Can you multiply any whole number by 15 to get 65?

g. Online "^" is used to indicate an exponent.

n^3 = n * n * n, while n^5 = n * n * n * n * n

h. n^2 = n * n

a. To determine if 7 ƒ 23 is true or false, we need to know what the symbol "ƒ" represents. Without knowing the definition of this symbol, we cannot assess the truth or falsehood of the statement.

b. To determine if 24 is a factor of 8, we need to check if 8 is divisible by 24 without any remainder. Since 8 is not divisible by 24, the statement is false.

c. To determine if 16 ƒ 16 is true or false, we need to know what the symbol "ƒ" represents. Without knowing the definition of this symbol, we cannot assess the truth or falsehood of the statement.

d. To determine if 0 ƒ 6 is true or false, we need to check if 0 is divisible by 6 without any remainder. Since 0 divided by any number other than 0 is always 0, the statement is true.

e. To determine if 15 ƒ 0 is true or false, we need to check if 15 is divisible by 0 without any remainder. However, division by zero is undefined in mathematics. Therefore, the statement is neither true nor false, it is undefined.

f. To determine if 65 is a multiple of 15, we need to check if 65 is divisible by 15 without any remainder. Since 65 divided by 15 has a remainder of 5, the statement is false.

g. To determine if n^3 is a divisor of n^5, we need to check if n^5 is divisible by n^3 without any remainder. Since n^5 divided by n^3 is equal to n^2, the statement is false.

h. To determine if a number is always a factor of its square, we need to check if any number multiplied by itself always results in a multiple of the original number. Since multiplying a number by itself always results in its square, the statement is true.